Database
SUPPLEMENTARY MATERIAL (USERS' MATHBOXES)
Mathbox for Eric Schmidt
Isomorphism of finite ordinals and non-negative integers
hashnna
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hashnnsuc
Metamath Proof Explorer
Ascii
Unicode
Theorem
hashnna
Description:
The
#
function on
_om
preserves addition.
(Contributed by
Eric Schmidt
, 7-Jul-2026)
Ref
Expression
Assertion
hashnna
⊢
A
∈
ω
∧
B
∈
ω
→
A
+
𝑜
B
=
A
+
B
Proof
Step
Hyp
Ref
Expression
1
hashgval2
⊢
.
↾
ω
=
rec
⁡
x
∈
V
⟼
x
+
1
0
↾
ω
2
1
hashgadd
⊢
A
∈
ω
∧
B
∈
ω
→
.
↾
ω
⁡
A
+
𝑜
B
=
.
↾
ω
⁡
A
+
.
↾
ω
⁡
B
3
nnacl
⊢
A
∈
ω
∧
B
∈
ω
→
A
+
𝑜
B
∈
ω
4
3
fvresd
⊢
A
∈
ω
∧
B
∈
ω
→
.
↾
ω
⁡
A
+
𝑜
B
=
A
+
𝑜
B
5
fvres
⊢
A
∈
ω
→
.
↾
ω
⁡
A
=
A
6
fvres
⊢
B
∈
ω
→
.
↾
ω
⁡
B
=
B
7
5
6
oveqan12d
⊢
A
∈
ω
∧
B
∈
ω
→
.
↾
ω
⁡
A
+
.
↾
ω
⁡
B
=
A
+
B
8
2
4
7
3eqtr3d
⊢
A
∈
ω
∧
B
∈
ω
→
A
+
𝑜
B
=
A
+
B